Event
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Event
Semester:
Winter term
2024
5.04.4651 Fouriertechniken in der Physik -
Event date(s) | room
- Dienstag, 15.10.2024 10:00 - 12:00 | W16A 010
- Dienstag, 22.10.2024 10:00 - 12:00 | W16A 010
- Dienstag, 29.10.2024 10:00 - 12:00 | W16A 010
- Dienstag, 5.11.2024 10:00 - 12:00 | W16A 010
- Dienstag, 12.11.2024 10:00 - 12:00 | W16A 010
- Dienstag, 19.11.2024 10:00 - 12:00 | W16A 010
- Dienstag, 26.11.2024 10:00 - 12:00 | W16A 010
- Dienstag, 3.12.2024 10:00 - 12:00 | W16A 010
- Dienstag, 10.12.2024 10:00 - 12:00 | W16A 010
- Dienstag, 17.12.2024 10:00 - 12:00 | W16A 010
- Dienstag, 7.1.2025 10:00 - 12:00 | W16A 010
- Dienstag, 14.1.2025 10:00 - 12:00 | W16A 010
- Dienstag, 21.1.2025 10:00 - 12:00 | W16A 010
- Dienstag, 28.1.2025 10:00 - 12:00 | W16A 010
Description
Content:
Motivation: Applications of the FT in physics. Examples for Fourier paires, properties of the FT: symmetries, important theorems, shifting, differentiation, convolution theorem, uncertainty relation. Examples concerning the convolution theorem: frequency comb, Hilbert transformation, autocorrelation function. Methods of the time/frequency analysis and Wigner distribution. FT in higher dimensions: tomography. Discrete FT, sampling theorem. Applications in quantum mechanics
lecturer
Study fields
- Studium generale / Gasthörstudium
SWS
2
Art der Lehre
Ausschließlich Präsenz
Lehrsprache
deutsch
Für Gasthörende / Studium generale geöffnet:
Ja
Hinweise zum Inhalt der Veranstaltung für Gasthörende
The students know the definition of the Fourier-Transformation (FT) and learn about explicit examples. They know the properties and theorems of the FT, are able to apply these and describe physical processes both in time and frequency domain. They gain deep insights about physical processes analyzing the frequency domain and are able to utilize Fourier techniques solving physical problems, e.g. finding solutions of the time dependent Schrödinger equation. In addition, they learn about examples of the current english physical literature.
Content:
Motivation: Applications of the FT in physics. Examples for Fourier paires, properties of the FT: symmetries, important theorems, shifting, differentiation, convolution theorem, uncertainty relation. Examples concerning the convolution theorem: frequency comb, Hilbert transformation, autocorrelation function. Methods of the time/frequency analysis and Wigner distribution. FT in higher dimensions: tomography. Discrete FT, sampling theorem. Applications in quantum mechanics